Converse
(Con*verse") v. i. [imp. & p. p. Conversed ; p. pr. & vb. n. Conversing.] [F. converser,
L. conversari to associate with; con- + versari to be turned, to live, remain, fr. versare to turn often,
v. intens. of vertere to turn See Convert.]
1. To keep company; to hold intimate intercourse; to commune; followed by with.
To seek the distant hills, and there converse
With nature.
Thomson.
Conversing with the world, we use the world's fashions.
Sir W. Scott.
But to converse with heaven -
This is not easy.
Wordsworth.
2. To engage in familiar colloquy; to interchange thoughts and opinions in a free, informal manner; to
chat; followed by with before a person; by on, about, concerning, etc., before a thing.
Companions
That do converse and waste the time together.
Shak.
We had conversed so often on that subject.
Dryden.
3. To have knowledge of, from long intercourse or study; said of things.
According as the objects they converse with afford greater or less variety.
Locke.
Syn. To associate; commune; discourse; talk; chat.
Converse
(Con"verse) n.
1. Frequent intercourse; familiar communion; intimate association. Glanvill.
"T is but to hold
Converse with Nature's charms, and view her stores unrolled.
Byron.
2. Familiar discourse; free interchange of thoughts or views; conversation; chat.
Formed by thy converse happily to steer
From grave to gay, from lively to severe.
Pope.
Converse
(Con"verse), a. [L. conversus, p. p. of convertere. See Convert.] Turned about; reversed
in order or relation; reciprocal; as, a converse proposition.
Converse
(Con"verse), n.
1. (Logic) A proposition which arises from interchanging the terms of another, as by putting the predicate
for the subject, and the subject for the predicate; as, no virtue is vice, no vice is virtue.
It should not (as is often done) be confounded with the contrary or opposite of a proposition, which is
formed by introducing the negative not or no.
2. (Math.) A proposition in which, after a conclusion from something supposed has been drawn, the
order is inverted, making the conclusion the supposition or premises, what was first supposed becoming
now the conclusion or inference. Thus, if two sides of a sides of a triangle are equal, the angles opposite
the sides are equal; and the converse is true, i.e., if these angles are equal, the two sides are equal.